Parabolic equations with singular divergence-free drift vector fields

Abstract

In this paper, we study an elliptic operator in divergence-form but not necessary symmetric. In particular, our results can be applied to elliptic operator L=+u(x,t)·∇, where u(·,t) is a time-dependent vector field in Rn, which is divergence-free in distribution sense, i.e. ∇· u=0. Suppose u∈ Lt∞(BMOx-1). We show the existence of the fundamental solution (x,t;,τ) of the parabolic operator L-∂t, and show that satisfies the Aronson estimate with a constant depending only on the dimension n, the elliptic constant and the norm u L∞(BMO-1). Therefore the existence and uniqueness of the parabolic equation (L-∂t)v=0 are established for initial data in L2-space, and their regularity is obtained too. In fact, we establish these results for a general non-symmetric elliptic operator in divergence form.